Exponential Probability Density Function
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An Exponential Probability Density Function is a continuous probability function that is an exponential function.
- Context:
- It can (typically) be a member of an Exponential Probability Distribution Family.
- …
- Example(s):
- Counter-Example(s):
- See: Gamma Function, Exponential Prior, Conjugate Distribution.
References
2006
- (Dubnicka, 2006g) ⇒ Suzanne R. Dubnicka. (2006). “Special Continuous Distributions - Handout 7." Kansas State University, Introduction to Probability and Statistics I, STAT 510 - Fall 2006.
- TERMINOLOGY : A random variable X is said to have an exponential distribution with parameter > 0 if its pdf is given by fX(x) =
- (e− x, x > 0
- 0, otherwise.
- TERMINOLOGY : A random variable X is said to have an exponential distribution with parameter > 0 if its pdf is given by fX(x) =